World Scientific
Skip main navigation
Close Drawer MenuOpen Drawer Menu

Cookies Notification

We use cookies on this site to enhance your user experience. By continuing to browse the site, you consent to the use of our cookies. Learn More
×
Our website is made possible by displaying certain online content using javascript.
In order to view the full content, please disable your ad blocker or whitelist our website www.worldscientific.com.

System Upgrade on Tue, May 19th, 2020 at 2am (ET)

During this period, E-commerce and registration of new users may not be available for up to 12 hours.
For online purchase, please visit us again. Contact us at [email protected] for any enquiries.
No Access

The attractor of piecewise expanding maps of the interval

    https://doi.org/10.1142/S0219493720500094Cited by:0
    Previous
    Next

    Abstract

    We consider piecewise expanding maps of the interval with finitely many branches of monotonicity and show that they are generically combinatorially stable, i.e. the number of ergodic attractors and their corresponding mixing components do not change under small perturbations of the map. Our methods provide a topological description of the attractor and give an elementary proof of the density of periodic orbits.

    AMSC: 37E05, 37A05, 37C75

    References

    • 1. V. Baladi and L. S. Young, On the spectra of randomly perturbed expanding maps, Comm. Math. Phys. 156 (1993) 355–385. Crossref, ISIGoogle Scholar
    • 2. M. L. Blank, Small perturbations of chaotic dynamical systems, Uspekhi Mat. Nauk 44 (1989) 3–28. Google Scholar
    • 3. A. Boyarsky and P. Góra, Laws of Chaos, Probability and Its Applications (Birkhäuser, Boston, 1997). CrossrefGoogle Scholar
    • 4. M. F. Demers and C. Liverani, Stability of statistical properties in two-dimensional piecewise hyperbolic maps, Trans. Amer. Math. Soc. 360 (2008) 4777–4814. Crossref, ISIGoogle Scholar
    • 5. P. Eslami and P. Góra, Stronger Lasota-Yorke inequality for one-dimensional piecewise expanding transformations, Proc. Amer. Math. Soc. 141 (2013) 4249–4260. Crossref, ISIGoogle Scholar
    • 6. P. Góra, On small stochastic perturbations of mappings of the unit interval, Colloq. Math. 49 (1984) 73–85. CrossrefGoogle Scholar
    • 7. F. Hofbauer, Generic properties of invariant measures for continuous piecewise monotonic transformations, Monatsh. Math. 106 (1988) 301–312. Crossref, ISIGoogle Scholar
    • 8. G. Keller, Stochastic stability in some chaotic dynamical systems, Monatsh. Math. 94 (1982) 313–333. Crossref, ISIGoogle Scholar
    • 9. G. Keller and C. Liverani, Stability of the spectrum for transfer operators, Ann. Scuola Normale Superiore di Pisa, Sci. Fisiche e Matematiche XXVIII (1999) 141–152. Google Scholar
    • 10. A. Lasota and J. A. Yorke, On the existence of invariant measures for piecewise monotonic transformations, Trans. Amer. Math. Soc. 186 (1973) 481–488. Crossref, ISIGoogle Scholar
    • 11. G. Del Magno, J. L. Dias, P. Duarte and J. Gaivão, Hyperbolic polygonal billiards with finitely may ergodic SRB measures, Ergodic Theory Dynamical Syst. 38(6) (2018) 2062–2085. https://doi.org/10.1017/etds.2016.119 CrossrefGoogle Scholar
    • 12. M. Rychlik, Bounded variation and invariant measures, Studia Math. 76 (1983) 69–80. Crossref, ISIGoogle Scholar
    • 13. E. A. Sataev, Ergodic properties of the Belykh map, J. Math. Sci. (New York) 95 (1999) 2564–2575. CrossrefGoogle Scholar
    • 14. M. Viana, Lecture Notes on Attractors and Physical Measures, Monografías del Instituto de Matemática y Ciencias Afines, Instituto de Matemática y Ciencias Afines, Vol. 8 (IMCA, 1999). Google Scholar
    • 15. L.-S. Young, Bowen-Ruelle measures for certain piecewise hyperbolic maps, Trans. Amer. Math. Soc. 287 (1985) 41–48. Crossref, ISIGoogle Scholar
    Published: 26 June 2019