scholarly journals On the invariant distributions of $$C^2$$ circle diffeomorphisms of irrational rotation number

2012 ◽  
Vol 274 (1-2) ◽  
pp. 315-321 ◽  
Author(s):  
Andrés Navas ◽  
Michele Triestino
Keyword(s):  
Rotation Number ◽  
Irrational Rotation ◽  
Invariant Distributions ◽  
Irrational Rotation Number ◽  
Circle Diffeomorphisms

A Necessary Condition of Nonminimal Aubry–Mather Sets for Monotone Recurrence Relations

2014 ◽  
Vol 24 (01) ◽  
pp. 1450012 ◽  
Author(s):  
Ya-Nan Wang ◽  
Wen-Xin Qin
Keyword(s):  
Rotation Number ◽  
Recurrence Relations ◽  
Irrational Rotation ◽  
Necessary Condition ◽  
Irrational Rotation Number

In this paper, we show that a necessary condition for nonminimal Aubry–Mather sets of monotone recurrence relations is that the set of all Birkhoff minimizers with some irrational rotation number does not constitute a foliation, i.e. the gaps of the minimal Aubry–Mather set are not filled up with Birkhoff minimizers.

scholarly journals On the structure of the family of Cherry fields on the torus

1985 ◽  
Vol 5 (1) ◽  
pp. 27-46 ◽  
Author(s):  
Colin Boyd
Keyword(s):  
Vector Field ◽  
Hausdorff Dimension ◽  
Rotation Number ◽  
Vector Fields ◽  
Cantor Set ◽  
Irrational Rotation ◽  
Codimension One ◽  
The Family ◽  
Irrational Rotation Number

AbstractA class of vector fields on the 2-torus, which includes Cherry fields, is studied. Natural paths through this class are defined and it is shown that the parameters for which the vector field is unstable is the closure ofhas irrational rotation number}, where ƒ is a certain map of the circle andRtis rotation throught. This is shown to be a Cantor set of zero Hausdorff dimension. The Cherry fields are shown to form a family of codimension one submanifolds of the set of vector fields. The natural paths are shown to be stable paths.

scholarly journals Attractors with irrational rotation number

2011 ◽  
Vol 153 (1) ◽  
pp. 59-77 ◽  
Author(s):  
LUIS HERNÁNDEZ-CORBATO ◽  
RAFAEL ORTEGA ◽  
FRANCISCO R. RUIZ DEL PORTAL
Keyword(s):  
Fixed Point ◽  
Rotation Number ◽  
Irrational Rotation ◽  
Asymptotically Stable ◽  
Stable Fixed Point ◽  
Region Of Attraction ◽  
Prime Ends ◽  
Irrational Rotation Number

AbstractLet h: 2 → 2 be a dissipative and orientation preserving homeomorphism having an asymptotically stable fixed point. Let U be the region of attraction and assume that it is proper and unbounded. Using Carathéodory's prime ends theory one can associate a rotation number, ρ, to h|U. We prove that any map in the above conditions and with ρ ∉ induces a Denjoy homeomorphism in the circle of prime ends. We also present some explicit examples of maps in this class and we show that, if the infinity point is accessible by an arc in U, ρ ∉ if and only if Per(h) = Fix(h) = {p}.

Complex bounds for renormalization of critical circle maps

1999 ◽  
Vol 19 (1) ◽  
pp. 227-257 ◽  
Author(s):  
MICHAEL YAMPOLSKY
Keyword(s):  
Rotation Number ◽  
A Priori ◽  
Julia Sets ◽  
Irrational Rotation ◽  
Local Connectivity ◽  
Circle Maps ◽  
Critical Circle ◽  
Irrational Rotation Number

We use the methods developed with Lyubich for proving complex bounds for real quadratics to extend de Faria's complex a priori bounds to all critical circle maps with an irrational rotation number. The contracting property for renormalizations of critical circle maps follows.As another application of our methods we present a new proof of a theorem of Petersen on local connectivity of some Siegel Julia sets.

Hausdorff dimension of invariant measure of circle diffeomorphisms with a break point

2017 ◽  
Vol 39 (5) ◽  
pp. 1331-1339
Author(s):  
KONSTANTIN KHANIN ◽  
SAŠA KOCIĆ
Keyword(s):  
Hausdorff Dimension ◽  
Invariant Measure ◽  
Rotation Number ◽  
Break Point ◽  
Irrational Rotation ◽  
Rotation Numbers ◽  
Circle Diffeomorphism ◽  
Almost All ◽  
Circle Diffeomorphisms

We prove that, for almost all irrational $\unicode[STIX]{x1D70C}\in (0,1)$, the Hausdorff dimension of the invariant measure of a $C^{2+\unicode[STIX]{x1D6FC}}$-smooth $(\unicode[STIX]{x1D6FC}\in (0,1))$ circle diffeomorphism with a break of size $c\in \mathbb{R}_{+}\backslash \{1\}$, with rotation number $\unicode[STIX]{x1D70C}$, is zero. This result cannot be extended to all irrational rotation numbers.

scholarly journals Cherry Maps with Different Critical Exponents: Bifurcation of Geometry

2020 ◽  
Vol 16 (4) ◽  
pp. 651-672
Author(s):  
B. Ndawa Tangue ◽  
Keyword(s):  
Hausdorff Dimension ◽  
Rotation Number ◽  
Critical Exponents ◽  
Irrational Rotation ◽  
Circle Maps ◽  
Irrational Rotation Number ◽  
Nonwandering Set ◽  
Flat Piece

We consider order-preserving $C^3$ circle maps with a flat piece, irrational rotation number and critical exponents $(l_1, l_2)$. We detect a change in the geometry of the system. For $(l_1, l_2) \in [1, 2]^2$ the geometry is degenerate and becomes bounded for $(l_1, l_2) \in [2, \infty)^2 \backslash \{(2, 2)\}$. When the rotation number is of the form $[abab \ldots]$; for some $a, b \in \mathbb{N}^*$, the geometry is bounded for $(l_1, l_2)$ belonging above a curve defined on $]1, +\infty[^2$. As a consequence, we estimate the Hausdorff dimension of the nonwandering set $K_f=\mathcal{S}^1\backslash \bigcup^\infty_{i=0}f^{-i}(U)$. Precisely, the Hausdorff dimension of this set is equal to zero when the geometry is degenerate and it is strictly positive when the geometry is bounded.

scholarly journals A Note on the Conjugacy Between Two Critical Circle Maps

2021 ◽  
pp. 287-300
Author(s):  
Utkir A. Safarov
Keyword(s):  
Critical Point ◽  
Rotation Number ◽  
Irrational Rotation ◽  
Singular Function ◽  
Circle Maps ◽  
Circle Homeomorphism ◽  
Critical Circle ◽  
Irrational Rotation Number

We study a conjugacy between two critical circle homeomorphisms with irrational rotation number. Let fi, i = 1, 2 be a C3 circle homeomorphisms with critical point x(i) cr of the order 2mi + 1. We prove that if 2m1 + 1 ̸= 2m2 + 1, then conjugating between f1 and f2 is a singular function. Keywords: circle homeomorphism, critical point, conjugating map, rotation number, singular function

scholarly journals Boundaries of instability zones for symplectic twist maps

2013 ◽  
Vol 13 (1) ◽  
pp. 19-41 ◽  
Author(s):  
M.-C. Arnaud
Keyword(s):  
Rotation Number ◽  
Irrational Rotation ◽  
Invariant Curve ◽  
Partial Answer ◽  
Twist Map ◽  
Instability Zone ◽  
Counter Example ◽  
Twist Maps ◽  
Irrational Rotation Number ◽  
The One

AbstractVery few things are known about the curves that are at the boundary of the instability zones of symplectic twist maps. It is known that in general they have an irrational rotation number and that they cannot be KAM curves. We address the following questions. Can they be very smooth? Can they be non-${C}^{1} $?Can they have a Diophantine or a Liouville rotation number? We give a partial answer for${C}^{1} $and${C}^{2} $twist maps.In Theorem 1, we construct a${C}^{2} $symplectic twist map$f$of the annulus that has an essential invariant curve$\Gamma $such that$\bullet $ $\Gamma $is not differentiable;$\bullet $the dynamics of${f}_{\vert \Gamma } $is conjugated to the one of a Denjoy counter-example;$\bullet $ $\Gamma $is at the boundary of an instability zone for$f$.Using the Hayashi connecting lemma, we prove in Theroem 2 that any symplectic twist map restricted to an essential invariant curve can be embedded as the dynamics along a boundary of an instability zone for some${C}^{1} $symplectic twist map.

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