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Strong stochastic stability for non-uniformly expanding maps

Published online by Cambridge University Press:  06 August 2012

JOSÉ F. ALVES  and
HELDER VILARINHO
JOSÉ F. ALVES
Affiliation:
CMUP, Rua do Campo Alegre 687, 4169-007 Porto, Portugal (email: [email protected])
HELDER VILARINHO
Affiliation:
Universidade da Beira Interior, Rua Marquês d’Ávila e Bolama, 6200-001 Covilhã, Portugal (email: [email protected])
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Abstract

We consider random perturbations of discrete-time dynamical systems. We give sufficient conditions for the stochastic stability of certain classes of maps, in a strong sense. This improves the main result in Alves and Araújo [Random perturbations of non-uniformly expanding maps. Astérisque 286 (2003), 25–62], where the stochastic stability in the $\mathrm {weak}^*$ topology was proved. Here, under slightly weaker assumptions on the random perturbations, we obtain a stronger version of stochastic stability: convergence of the density of the stationary measure to the density of the Sinai–Ruelle–Bowen (SRB) measure of the unperturbed system in the $L^1$-norm. As an application of our results, we obtain strong stochastic stability for two classes of non-uniformly expanding maps. The first one is an open class of local diffeomorphisms introduced in Alves, Bonatti and Viana [SRB measures for partially hyperbolic systems whose central direction is mostly expanding. Invent. Math. 140 (2000), 351–398] and the second one is the class of Viana maps.

Type
Research Article
Information
Ergodic Theory and Dynamical Systems , Volume 33 , Issue 3 , June 2013 , pp. 647 - 692
Copyright
Copyright © 2012 Cambridge University Press

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References

[Al00]Alves, J. F.. SRB measures for non-hyperbolic systems with multidimensional expansion. Ann. Scient. Éc. Norm. Sup., 4e série 33 (2000), 132.Google Scholar
[Al03]Alves, J. F.. Statistical analysis of non-uniformly expanding dynamical systems, 24th Braz. Math. Colloq., IMPA, Rio de Janeiro, 2003.Google Scholar
[Al04]Alves, J. F.. Strong statistical stability of non-uniformly expanding maps. Nonlinearity 17(4) (2004), 11931215.Google Scholar
[AA03]Alves, J. F. and Araújo, V.. Random perturbations of non-uniformly expanding maps. Astérisque 286 (2003), 2562.Google Scholar
[AAV07]Alves, J. F., Araújo, V. and Vásquez, C. H.. Stochastic stability of non-uniformly hyperbolic diffeomorphisms. Stoch. Dyn. 7(3) (2007), 299333.Google Scholar
[ABV00]Alves, J. F., Bonatti, C. and Viana, M.. SRB measures for partially hyperbolic systems whose central direction is mostly expanding. Invent. Math. 140 (2000), 351398.CrossRefGoogle Scholar
[ALP05]Alves, J. F., Luzzatto, S. and Pinheiro, V.. Markov structures and decay of correlations for non-uniformly expanding dynamical systems. Ann. Inst. H. Poincaré Anal. Non Linéaire 22(6) (2005), 817839.Google Scholar
[AV02]Alves, J. F. and Viana, M.. Statistical stability for robust classes of maps with non-uniform expansion. Ergod. Th. & Dynam. Sys. 22 (2002), 132.Google Scholar
[Ara00]Araújo, V.. Attractors and time averages for random maps. Ann. Inst. H. Poincaré Anal. Non Linéaire 17 (2000), 307369.Google Scholar
[Arn98]Arnold, L.. Random Dynamical Systems. Springer, Berlin, 1998.Google Scholar
[Ba97]Baladi, V.. Correlation spectrum of quenched and annealed equilibrium states for random expanding maps. Commun. Math. Phys. 186 (1997), 671700.Google Scholar
[BBM02]Baladi, V., Benedicks, M. and Maume-Deschamps, V.. Almost sure rates of mixing for i.i.d. unimodal maps. Ann. Scient. Éc. Norm. Sup., 4e série 35 (2002), 77126.Google Scholar
[BBM10]Baladi, V., Benedicks, M. and Maume-Deschamps, V.. Correcting the proof of Theorem 3.2 in Almost sure rates of mixing for i.i.d. unimodal maps. Ann. E.N.S. (2002), arXiv:1008.5165 (2010).Google Scholar
[BKS96]Baladi, V., Kondah, A. and Schmitt, B.. Random correlations for small perturbations of expanding maps. Random Comput. Dynam. 4 (1996), 179204.Google Scholar
[BaV96]Baladi, V. and Viana, M.. Strong stochastic stability and rate of mixing for unimodal maps. Ann. Scient. Éc. Norm. Sup., 4e série 29 (1996), 483517.Google Scholar
[BaY93]Baladi, V. and Young, L.-S.. On the spectra of randomly perturbed expanding maps. Comm. Math. Phys 156 (1993), 355385; Erratum, Comm. Math. Phys. 166 (1994), 219–220.Google Scholar
[BeC85]Benedicks, M. and Carleson, L.. On iterations of $1-ax^2$ on ($-1, 1$). Ann. of Math. (2) 122 (1985), 125.Google Scholar
[BeC91]Benedicks, M. and Carleson, L.. The dynamics of the Hénon map. Ann. of Math. (2) 133 (1991), 73169.Google Scholar
[BeV06]Benedicks, M. and Viana, M.. Random perturbations and statistical properties of Hénon-like maps. Ann. Inst. H. Poincaré Anal. Non Linéaire 23(5) (2006), 713752.Google Scholar
[BeY92]Benedicks, M. and Young, L.-S.. Absolutely continuous invariant measures and random perturbations for certain one-dimensional maps. Ergod. Th. & Dynam. Sys. 12 (1992), 1337.Google Scholar
[Bo75]Bowen, R.. Equilibrium States and the Ergodic Theory of Axiom A Diffeomorphisms (Lecture Notes in Mathematics, 480). Springer, 1975.Google Scholar
[BR75]Bowen, R. and Ruelle, D.. The ergodic theory of Axiom A flows. Invent. Math. 29 (1975), 181202.Google Scholar
[CE80]Collet, P. and Eckmann, J.. On the abundance of aperiodic behavior for maps on the interval. Comm. Math. Phys. 73 (1980), 115160.Google Scholar
[CY05]Cowieson, W. and Young, L.-S.. SRB measures as zero-noise limits. Ergod. Th. & Dynam. Sys. 25(4) (2005), 10911113.CrossRefGoogle Scholar
[Ja81]Jakobson, M.. Absolutely continuous invariant measures for one parameter families of one-dimensional maps. Comm. Math. Phys. 81 (1981), 3988.Google Scholar
[KK86]Katok, A. and Kifer, Y.. Random perturbations of transformations of an interval. J. Anal. Math. 47 (1986), 193237.Google Scholar
[Ki86]Kifer, Y.. Ergodic Theory of Random Perturbations. Birkhäuser, Boston, Basel, 1986.CrossRefGoogle Scholar
[Ki88]Kifer, Y.. Random Perturbations of Dynamical Systems. Birkhäuser, Boston, Basel, 1988.Google Scholar
[KS69]Krzyzewski, K. and Szlenk, W.. On invariant measures for expanding differentiable mappings. Stud. Math. 33 (1969), 8392.Google Scholar
[LQ95]Liu, P.-D. and Qian, M.. Smooth Ergodic Theory of Random Dynamical Systems. Springer, Heidelberg, 1995.Google Scholar
[Me00]Metzger, R. J.. Stochastic stability for contracting Lorenz maps and flows. Commun. Math. Phys. 212 (2000), 277296.Google Scholar
[Oh83]Ohno, T.. Asymptotic behaviors of dynamical systems with random parameters. Publ. RIMS Kyoto Univ. 19 (1983), 8398.Google Scholar
[Pa00]Palis, J.. A global view of dynamics and a conjecture on the denseness of finitude of attractors. Astérisque 261 (2000), 335347.Google Scholar
[Ru76]Ruelle, D.. A measure associated with Axiom A attractors. Amer. Jour. Math. 98 (1976), 619654.Google Scholar
[Si72]Sinai, Y.. Gibbs measures in ergodic theory. Russ. Math. Surv. 27(4) (1972), 2169.Google Scholar
[Vi97]Viana, M.. Multidimensional non-hyperbolic attractors. Publ. Math. IHES 85 (1997), 6396.Google Scholar
[Yo86]Young, L.-S.. Stochastic stability of hyperbolic attractors. Ergod. Th. & Dynam. Sys. 6 (1986), 311319.CrossRefGoogle Scholar
[Yo99]Young, L.-S.. Recurrence times and rates of mixing. Israel J. Math. 110 (1999), 153188.Google Scholar
[Yo02]Young, L.-S.. What are SRB measures, and which dynamical systems have them? J. Stat. Phys. 108(5) (2002), 733754.CrossRefGoogle Scholar