Twist sets for maps of the circle

Michał Misiurewicz

doi:10.1017/S0143385700002534

Abstract

Core share and HTML view are not available for this content. However, as you have access to this content, a full PDF is available via the ‘Save PDF’ action button.

Let f be a continuous map of degree one of the circle onto itself. We prove that for every number a from the rotation interval of f there exists an invariant closed set A consisting of points with rotation number a and such that f restricted to A preserves the order. This result is analogous to the one in the case of a twist map of an annulus.

References

REFERENCES

[1]Alseda, L. & Llibre, J.. On the behaviour of the minimal periodic orbits of continuous mappings of the circle and of the interval. Preprint.Google Scholar

[2]Alseda, L., Llibre, J., Misiurewicz, M. & Simo, C.. Twist periodic orbits and topological entropy for continuous maps of the circle of degree one which have a fixed point. Preprint.Google Scholar

[3]Block, L., Guckenheimer, J., Misiurewicz, M. & Young, L.-S.. Periodic points and topological entropy for one-dimensional maps. In Global Theory of Dynamical Systems, Lecture Notes in Math. 819. Springer: Berlin, 1980, pp. 18–34.CrossRef Google Scholar

[4]Ito, R.. Rotation sets are closed. Math. Proc. Camb. Phil. Soc. 89 (1981), 107–111.CrossRef Google Scholar

[5]Katok, A.. Some remarks on Birkhoff and Mather twist maps theorems. Ergod. Th. & Dynam. Sys. 2 (1982), 185–194.CrossRef Google Scholar

[6]Misiurewicz, M.. Periodic points of maps of degree one of a circle. Ergod. Th. & Dynam. Sys. 2 (1982), 221–227.CrossRef Google Scholar

[7]Newhouse, S., Palis, J. – Takens, . Bifurcations and stability of families of diffeomorphisms. Publ. IHES. 57(1983), 5–72.CrossRef Google Scholar

Crossref Citations

This article has been cited by the following publications. This list is generated based on data provided by Crossref.

Mackay, R.S. and Tresser, C. 1986. Transition to topological chaos for circle maps. Physica D: Nonlinear Phenomena, Vol. 19, Issue. 2, p. 206.

Misiurewicz, Michał 1986. Rotation intervals for a class of maps of the real line into itself. Ergodic Theory and Dynamical Systems, Vol. 6, Issue. 1, p. 117.

Dolník, M. Schreiber, I. and Marek, M. 1986. Dynamic regimes in a periodically forced reaction cell with oscillatory chemical reaction. Physica D: Nonlinear Phenomena, Vol. 21, Issue. 1, p. 78.

Hockett, K 1988. Bifurcation to rotating Cantor sets in maps of the circle. Nonlinearity, Vol. 1, Issue. 4, p. 603.

Alseda, L Llibre, J Manosas, F and Misiurewicz, M 1988. Lower bounds of the topological entropy for continuous maps of the circle of degree one. Nonlinearity, Vol. 1, Issue. 3, p. 463.

Hockett, Kevin and Holmes, Philip 1988. Bifurcation to badly ordered orbits in one-parameter families of circle maps, or angels fallen from the devil’s staircase. Proceedings of the American Mathematical Society, Vol. 102, Issue. 4, p. 1031.

Le Calvez, P. 1988. Propriétés des attracteurs de Birkhoff. Ergodic Theory and Dynamical Systems, Vol. 8, Issue. 2, p. 241.

Block, Louis Coven, Ethan M. Jonker, Leo and Misiurewicz, Michał 1989. Primary cycles on the circle. Transactions of the American Mathematical Society, Vol. 311, Issue. 1, p. 323.

Alseda, L and Manosas, F 1990. Kneading theory and rotation intervals for a class of circle maps of degree one. Nonlinearity, Vol. 3, Issue. 2, p. 413.

Llibre, J. and Mackay, R. S. 1991. Rotation vectors and entropy for homeomorphisms of the torus isotopic to the identity. Ergodic Theory and Dynamical Systems, Vol. 11, Issue. 1, p. 115.

Alsedà, Lluís Mañosas, Francesc and Szlenk, Wiesław 1993. A characterization of the uniquely ergodic endomorphisms of the circle. Proceedings of the American Mathematical Society, Vol. 117, Issue. 3, p. 711.

Epstein, Adam Keen, Linda and Tresser, Charles 1995. The set of maps $$F_{a,b} :x \mapsto x + a + \tfrac{b}{{2\pi }}$$ sin(2πx) with any given rotation interval is contractiblewith any given rotation interval is contractible. Communications in Mathematical Physics, Vol. 173, Issue. 2, p. 313.

Campbell, David K. Galeeva, Roza Tresser, Charles and Uherka, David J. 1996. Piecewise linear models for the quasiperiodic transition to chaos. Chaos: An Interdisciplinary Journal of Nonlinear Science, Vol. 6, Issue. 2, p. 121.

Blokh, Alexander and Misiurewicz, Michał 1997. Entropy of twist interval maps. Israel Journal of Mathematics, Vol. 102, Issue. 1, p. 61.

MIYAZAWA, Megumi 2002. Chaos and Entropy for Circle Maps. Tokyo Journal of Mathematics, Vol. 25, Issue. 2,

Blokh, A. and Snider, K. 2013. Over-rotation numbers for unimodal maps. Journal of Difference Equations and Applications, Vol. 19, Issue. 7, p. 1108.

Llibre, Jaume 2015. Brief survey on the topological entropy. Discrete & Continuous Dynamical Systems - B, Vol. 20, Issue. 10, p. 3363.

Zhou, Tong and Qin, Wen-Xin 2021. Pseudo solutions, rotation sets, and shadowing rotations for monotone recurrence relations. Mathematische Zeitschrift, Vol. 297, Issue. 3-4, p. 1673.

Blokh, Alexander M. and Sharkovsky, Oleksandr M. 2022. Sharkovsky Ordering. p. 51.

Zhou, Tong Hu, Wen-Juan Huang, Qi-Ming and Qin, Wen-Xin 2022. ρ-bounded orbits and Arnold tongues for quasiperiodically forced circle maps* . Nonlinearity, Vol. 35, Issue. 3, p. 1119.

Download full list

Article contents

Twist sets for maps of the circle

Abstract

References

REFERENCES

Save article to Kindle

Save article to Dropbox

Save article to Google Drive

Reply to: Submit a response

Your details

You have entered the maximum number of contributors

Conflicting interests