Rotation sets for orbits of degree one circle maps

Lluís Alsedà; Francesc Mañosas; Moira Chas

doi:10.1142/S0218127402004437

Rotation sets for orbits of degree one circle maps

Lluís Alsedà
, Francesc Mañosas
, Moira Chas

Mathematics

Polytechnic University of Catalonia
Autonomous University of Barcelona

Research output: Contribution to journal › Article › peer-review

Abstract

Let F be the lifting of a circle map of degree one. In [Bamón et al., 1984] a notion of F-rotation interval of a point x ∈ S¹ was given. In this paper we define and study a new notion of a rotation set of a point which preserves more of the dynamical information contained in the sequences {Fⁿ(y)}_n=0^∞ than the one preserved from [Bamón et al., 1984]. In particular, we characterize dynamically the endpoints of these sets and we obtain an analogous version of the Main Theorem of [Bamón et al., 1984] in our settings.

Original language	English
Pages (from-to)	429-437
Number of pages	9
Journal	International Journal of Bifurcation and Chaos in Applied Sciences and Engineering
Volume	12
Issue number	2
DOIs	https://doi.org/10.1142/S0218127402004437
State	Published - 2002

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abstract = "Let F be the lifting of a circle map of degree one. In [Bam{\'o}n et al., 1984] a notion of F-rotation interval of a point x ∈ S1 was given. In this paper we define and study a new notion of a rotation set of a point which preserves more of the dynamical information contained in the sequences \{Fn(y)\}n=0∞ than the one preserved from [Bam{\'o}n et al., 1984]. In particular, we characterize dynamically the endpoints of these sets and we obtain an analogous version of the Main Theorem of [Bam{\'o}n et al., 1984] in our settings.",

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AU - Alsedà, Lluís

AU - Mañosas, Francesc

AU - Chas, Moira

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N2 - Let F be the lifting of a circle map of degree one. In [Bamón et al., 1984] a notion of F-rotation interval of a point x ∈ S1 was given. In this paper we define and study a new notion of a rotation set of a point which preserves more of the dynamical information contained in the sequences {Fn(y)}n=0∞ than the one preserved from [Bamón et al., 1984]. In particular, we characterize dynamically the endpoints of these sets and we obtain an analogous version of the Main Theorem of [Bamón et al., 1984] in our settings.

AB - Let F be the lifting of a circle map of degree one. In [Bamón et al., 1984] a notion of F-rotation interval of a point x ∈ S1 was given. In this paper we define and study a new notion of a rotation set of a point which preserves more of the dynamical information contained in the sequences {Fn(y)}n=0∞ than the one preserved from [Bamón et al., 1984]. In particular, we characterize dynamically the endpoints of these sets and we obtain an analogous version of the Main Theorem of [Bamón et al., 1984] in our settings.

UR - https://www.scopus.com/pages/publications/0036339941

U2 - 10.1142/S0218127402004437

DO - 10.1142/S0218127402004437

M3 - Article

AN - SCOPUS:0036339941

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SP - 429

EP - 437

JO - International Journal of Bifurcation and Chaos in Applied Sciences and Engineering

JF - International Journal of Bifurcation and Chaos in Applied Sciences and Engineering

IS - 2

ER -

Rotation sets for orbits of degree one circle maps

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