Journal ArticleDOI
Rational rotation numbers for maps of the circle
TLDR
In this article, the authors consider families of maps of the circle of degree 1 which are homeomorphisms but not diffeomorphisms, and prove that the set of parameter values corresponding to irrational rotation numbers has Lebesgue measure 0.Abstract:
We consider families of maps of the circle of degree 1 which are homeomorphisms but not diffeomorphisms, that is maps like
$$x \to x + t + \frac{c}{{2\pi }}\sin (2\pi x)(\bmod 1)$$
withc=1. We prove that the set of parameter values corresponding to irrational rotation numbers has Lebesgue measure 0. In other words, the intervals on which frequency-locking occurs fill up the set of full measure.read more
Citations
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Journal ArticleDOI
Growth Sequences for Circle Diffeomorphisms
TL;DR: In this paper, the growth sequences of the differential for iterations of circle diffeomorphisms without periodic points were obtained. But the growth sequence was not shown for iterations with periodic points.
Journal ArticleDOI
Notes on a theorem of Katznelson and Ornstein
TL;DR: There exists a subset of irrational numbers of unbounded type, such that every circle diffeomorphism satisfying the corresponding Zygmund condition is absolutely continuously conjugate to the linear rotation provided its rotation number belongs to the above set.
Journal ArticleDOI
Hausdorff Dimension of Invariant Measures of Multicritical Circle Maps
TL;DR: In this paper, the Hausdorff dimension of the unique invariant measure of multicritical circle maps without periodic points has been shown to be Ω(C^3)-approximable.
Posted Content
Local Connectivity of Polynomial Julia sets at Bounded Type Siegel Boundaries
TL;DR: In this article, it was shown that there does not exist a hedgehog containing a Siegel disk with a rotation number of bounded type, and that if the Julia set of a polynomial is connected, then the hedgehog is locally connected at the Siegel boundary.
References
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Book
An Introduction to the Theory of Numbers
TL;DR: The fifth edition of the introduction to the theory of numbers has been published by as discussed by the authors, and the main changes are in the notes at the end of each chapter, where the author seeks to provide up-to-date references for the reader who wishes to pursue a particular topic further and to present a reasonably accurate account of the present state of knowledge.
Journal ArticleDOI
Complete Devil's Staircase, Fractal Dimension, and Universality of Mode- Locking Structure in the Circle Map
TL;DR: In this paper, it was shown numerically that the stability intervals for limit cycles of the circle map form a complete devil's staircase at the onset of chaos and the complementary set to the stability interval is a Cantor set of fractal dimension $D=0.87.
Journal ArticleDOI
A structure theorem in one dimensional dynamics
W. de Melo,S. van Strien +1 more
TL;DR: On considere la classe #7B-A des applications C ∞ f:[0, 1]→[0,1] telles que f(0)=f(1)=0 et f a unique point critique C ∈(0, 2) as mentioned in this paper.